Apply the Triangle Inequality Theorem to determine whether a triangle can be formed from sides of lengths 7
millimeters, 8 millimeters, and 9 millimeters. (1 point)
O Yes, because the sum of any two sides is greater than the third side.
O Yes, because the sum of any two sides is less than the third side.
O No, because the sum of any two sides is less than the third side.
O No, because the sum of any two sides is greater than the third side.
7 answers
O Yes, because the sum of any two sides is greater than the third side.
Apply the Triangle Inequality Theorem to determine whether a triangle can be formed from sides of lengths 7
millimeters, 8 millimeters, and 9 millimeters. (1 point)
O Yes, because the sum of any two sides is greater than the third side.
O Yes, because the sum of any two sides is less than the third side.
O No, because the sum of any two sides is less than the third side.
O No, because the sum of any two sides is greater than the third side.
millimeters, 8 millimeters, and 9 millimeters. (1 point)
O Yes, because the sum of any two sides is greater than the third side.
O Yes, because the sum of any two sides is less than the third side.
O No, because the sum of any two sides is less than the third side.
O No, because the sum of any two sides is greater than the third side.
O Yes, because the sum of any two sides is greater than the third side.
Apply the Triangle Inequality Theorem to determine whether sides with lengths of 5 inches, 10 inches, and 15
inches form a triangle. (1 point)
O Yes. because the sum of 5 + 10 is less than or equal to 15.
O Yes, the majority of the conditions are met.
O No, because the sum of 5 + 10 is not greater than 15.
O Yes, because the sum of 5 + 10 is not greater than 15.
inches form a triangle. (1 point)
O Yes. because the sum of 5 + 10 is less than or equal to 15.
O Yes, the majority of the conditions are met.
O No, because the sum of 5 + 10 is not greater than 15.
O Yes, because the sum of 5 + 10 is not greater than 15.
O No, because the sum of 5 + 10 is not greater than 15.
Apply the Triangle Inequality Theorem to determine whether sides with lengths of 3 inches, 4 inches, and 9
inches form a triangle. (1 point)
O Yes, the majority of the conditions are met.
O Yes, because the sum of any two sides is less than the third side.
O No. because 3 + 4 is less than 9
O Yes, because 3 + 4 is less than 9
inches form a triangle. (1 point)
O Yes, the majority of the conditions are met.
O Yes, because the sum of any two sides is less than the third side.
O No. because 3 + 4 is less than 9
O Yes, because 3 + 4 is less than 9
O No, because 3 + 4 is less than 9.